Friday 22 nd Oct. 2010 SPM fMRI course Wellcome Trust Centre for Neuroimaging London

Dynamic Causal Modelling for fMRI AndréMarreiros Friday 22nd Oct. 2010 SPM fMRI course Wellcome Trust Centre for Neuroimaging London

Overview • Brain connectivity: types & definitions • Anatomical connectivity • Functional connectivity • Effective connectivity • Dynamic causal models (DCMs) • Neuronal model • Hemodynamic model • Estimation: Bayesian framework • Applications & extensions of DCM to fMRI data

Principles of Organisation Functional integration Functional specialization

Structural, functional & effective connectivity anatomical/structural connectivity= presence of axonal connections functional connectivity = statistical dependencies between regional time series effective connectivity = causal (directed) influences between neurons or neuronal populations Sporns 2007, Scholarpedia

Anatomical connectivity Definition: presence of axonal connections neuronal communication via synaptic contacts Measured with tracing techniques diffusion tensor imaging (DTI)

Knowing anatomical connectivity is not enough... Context-dependent recruiting of connections : Local functions depend on network activity Connections show synaptic plasticity change in the structure and transmission properties of a synapse even at short timescales Look at functional and effective connectivity

Definition: statistical dependencies between regional time series Seed voxel correlation analysis Coherence analysis Eigen-decomposition (PCA, SVD) Independent component analysis (ICA) any technique describing statistical dependencies amongst regional time series Functional connectivity

Seed-voxel correlation analyses hypothesis-driven choice of a seed voxel extract reference time series voxel-wise correlation with time series from all other voxels in the brain seed voxel

Pros & Cons of functional connectivity analysis Pros: useful when we have no experimental control over the system of interest and no model of what caused the data (e.g. sleep, hallucinations, etc.) Cons: interpretation of resulting patterns is difficult / arbitrary no mechanistic insight usually suboptimal for situations where we have a priori knowledge / experimental control  Effective connectivity

Effective connectivity Definition: causal (directed) influences between neurons or neuronal populations In vivo and in vitro stimulation and recording Models of causal interactions among neuronal populations explain regional effects in terms of interregional connectivity

Some models for computing effective connectivity from fMRI data • Structural Equation Modelling (SEM) McIntosh et al. 1991, 1994; Büchel & Friston 1997; Bullmore et al. 2000 • regression models (e.g. psycho-physiological interactions, PPIs)Friston et al. 1997 • Volterra kernels Friston & Büchel 2000 • Time series models (e.g. MAR, Granger causality)Harrison et al. 2003, Goebel et al. 2003 • Dynamic Causal Modelling (DCM)bilinear: Friston et al. 2003; nonlinear: Stephan et al. 2008

V5 Psycho-physiological interaction (PPI) • bilinear model of how the psychological context A changes the influence of area B on area C : B x A C • A PPI corresponds to differences in regression slopes for different contexts. attention V1 x Att. V5 activity no attention V1 activity Friston et al. 1997, NeuroImage Büchel & Friston 1997, Cereb. Cortex

Pros & Cons of PPIs • Pros: • given a single source region, we can test for its context-dependent connectivity across the entire brain • easy to implement • Cons: • only allows to model contributions from a single area • operates at the level of BOLD time series (SPM 99/2). • SPM 5/8 deconvolves the BOLD signal to form the proper interaction term, and then reconvolves it. • ignores time-series properties of the data Dynamic Causal Models needed for more robust statements of effective connectivity.

Overview • Brain connectivity: types & definitions • Anatomical connectivity • Functional connectivity • Effective connectivity • Dynamic causal models (DCMs) • Basic idea • Neuronal model • Hemodynamic model • Parameter estimation, priors & inference • Applications & extensions of DCM to fMRI data

Basics of Dynamic Causal Modelling • DCM allows us to look at how areas within a network interact: • Investigate functional integration & modulation of specific cortical pathways • Temporal dependency of activity within and between areas (causality)

Temporal dependence and causal relations Seed voxel approach, PPI etc. Dynamic Causal Models timeseries (neuronal activity)

Basics of Dynamic Causal Modelling • DCM allows us to look at how areas within a network interact: • Investigate functional integration & modulation of specific cortical pathways • Temporal dependency of activity within and between areas (causality) • Separate neuronal activity from observed BOLD responses

Z λ y Basics of DCM: Neuronal and BOLD level • Cognitive system is modelled at its underlying neuronal level (not directly accessible for fMRI). • The modelled neuronal dynamics (Z) are transformed into area-specific BOLD signals (y) by a hemodynamicmodel (λ). The aim of DCM is to estimate parameters at the neuronal level such that the modelled and measured BOLD signals are optimally similar.

Neuronal systems are represented by differential equations systemz(t) state Input u(t) A System is a set of elements zn(t) which interact in a spatially and temporally specific fashion connectivity parameters  • State changes of the system states are dependent on: • the current state z • external inputs u • its connectivity θ • time constants & delays

DCM parameters = rate constants Generic solution to the ODEs in DCM: z1 Decay function 1 Half-life 0.8 0.6 0.4 0.2 0 -0.1 0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9

A B DCM parameters = rate constants Generic solution to the ODEs in DCM: z1 Decay function 1 0.8 If AB is 0.10 s-1 this means that, per unit time, the increase in activity in B corresponds to 10% of the activity in A 0.6 0.4 0.2 0.10 0 -0.1 0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9

z2 sa21t z1 Linear dynamics: 2 nodes z1 z2

Neurodynamics: 2 nodes with input u1 u2 u1 z1 z1 z2 z2 activity in z2 is coupled to z1 via coefficient a21

Neurodynamics: positive modulation u1 u1 u2 u2 z1 z1 z2 z2 index, not squared modulatory input u2 activity through the coupling a21

Neurodynamics: reciprocal connections u1 u1 u2 u2 z1 z1 z2 z2 reciprocal connection disclosed by u2

Haemodynamics: reciprocal connections u1 BOLD (without noise) u2 h1 z1 BOLD (without noise) h2 z2 blue: neuronal activity red: bold response h(u,θ) represents the BOLD response (balloon model) to input

Haemodynamics: reciprocal connections u1 BOLD with Noise added u2 y1 z1 BOLD with Noise added y2 z2 blue: neuronal activity red: bold response y represents simulated observation of BOLD response, i.e. includes noise

Bilinear state equation in DCM for fMRI modulation of connectivity state vector direct inputs state changes externalinputs connectivity n regions m drv inputs m mod inputs

z λ y Conceptual overview Neuronal state equation The bilinear model effective connectivity modulation of connectivity Input u(t) direct inputs c1 b23 integration neuronal states a12 activity z2(t) activity z3(t) activity z1(t) haemodynamic model y y y BOLD Friston et al. 2003,NeuroImage

The hemodynamic “Balloon” model Region-specific HRFs! 6 haemodynamic parameters Friston et al. 2000, NeuroImage Stephan et al. 2007, NeuroImage

State space Model Model inversion using Expectation-maximization DCM roadmap Neuronal dynamics Hemodynamics Priors Posterior densities of parameters fMRI data Model selection

Estimation: Bayesian framework • Models of • Haemodynamics in a single region • Neuronal interactions • Constraints on • Haemodynamic parameters • Connections likelihood term prior posterior Bayesian estimation

stimulus function u Overview:parameter estimation neuronal state equation • Specify model (neuronal and haemodynamic level) • Make it an observation model by adding measurement errore and confounds X (e.g. drift). • Bayesian parameter estimation using expectation-maximization. • Result:(Normal) posterior parameter distributions, given by mean ηθ|y and Covariance Cθ|y. parameters hidden states state equation ηθ|y observation model modeled BOLD response

Parameter estimation: an example Input coupling, c1 Simulated response u1 z1 Forward coupling, a21 z2 Prior density Posterior density true values

 ηθ|y Inference about DCM parameters • Bayesian single subject analysis • The model parameters are distributions that have a mean ηθ|y and covariance Cθ|y. • Use of the cumulative normal distribution to test the probability that a certain parameter is above a chosen threshold γ: • Classical frequentist test across groups • Test summary statistic: mean ηθ|y • One-sample t-test: Parameter > 0? • Paired t-test: parameter 1 > parameter 2? • rmANOVA: e.g. in case of multiple sessions per subject Bayesian parameter averaging

Pitt & Miyung (2002), TICS Model comparison and selection Given competing hypotheses, which model is the best?

Inference on model space • Model evidence: The optimal balance of fit and complexity • Comparing models • Which is the best model?

Inference on model space • Model evidence: The optimal balance of fit and complexity • Comparing models • Which is the best model? • Comparing families of models • What type of model is best? • Feedforwardvs feedback • Parallel vs sequential processing • With or without modulation

C C A A D B B Inference on model space • Model evidence: The optimal balance of fit and complexity • Comparing models • Which is the best model? • Comparing families of models • What type of model is best? • Feedforwardvs feedback • Parallel vs sequential processing • With or without modulation • Only compare models with the same data

Overview • Brain connectivity: types & definitions • Anatomical connectivity • Functional connectivity • Effective connectivity • Dynamic causal models (DCMs) • Neuronal model • Hemodynamic model • Estimation: Bayesian framework • Applications & extensions of DCM to fMRI data

Attention to motion in the visual system We used this model to assess the site of attention modulation during visual motion processing in an fMRI paradigm reported by Büchel & Friston. Attention Time [s] ? SPC Photic • - fixation only • observe static dots + photic  V1 • - observe moving dots + motion  V5 • task on moving dots + attention  V5 + parietal cortex V5 V1 Motion Friston et al. 2003,NeuroImage

Model 2:attentional modulationof SPC→V5 SPC V1 V5 Attention Photic 0.55 0.86 0.75 1.42 0.89 -0.02 0.56 Motion Comparison of two simple models Model 1:attentional modulationof V1→V5 Photic SPC 0.85 0.70 0.84 1.36 V1 -0.02 0.57 V5 Motion 0.23 Attention Bayesian model selection: Model 1 better than model 2 → Decision for model 1: in this experiment, attention primarily modulates V1→V5

Extension I: Slice timing model • potential timing problem in DCM: • temporal shift between regional time series because of multi-slice acquisition 2 slice acquisition 1 visualinput • Solution: • Modelling of (known) slice timing of each area. • Slice timing extension now allows for any slice timing differences! • Long TRs (> 2 sec) no longer a limitation. • (Kiebel et al., 2007)

¶ x = + u ( AB ) x Cu ¶ t é ù é ù L EE EI E A - - x A A e e e 0 11 11 1 N 1 ê ú ê ú IE II I - x A A e e 0 0 ê ú ê ú 11 11 1 ê ú ê ú M = = M O M A x ( t ) ê ú ê ú EE EI E A - - x A A ê ú e 0 e e ê ú N 1 NN NN N ê ú ê ú L IE II I - x A A 0 0 e e ë û ë û NN NN N Extension II: Two-state model Single-state DCM Two-state DCM input Extrinsic (between-region) coupling Intrinsic (within-region) coupling

DCM for Büchel & Friston Attention - BCW Attention b - Intr Example: Two-state Model Comparison - FWD Attention

Extension III: Nonlinear DCM for fMRI nonlinear DCM bilinear DCM u2 u2 u1 u1 Bilinear state equation Nonlinear state equation Here DCM can model activity-dependent changes in connectivity; how connections are enabled or gated by activity in one or more areas.

Extension III: Nonlinear DCM for fMRI Can V5 activity during attention to motion be explained by allowing activity in SPC to modulate the V1-to-V5 connection? attention . 0.19 (100%) The posterior density of indicates that this gating existed with 97% confidence. (The D matrix encodes which of the n neural units gate which connections in the system) SPC 0.03 (100%) 0.01 (97.4%) 1.65 (100%) visual stimulation V1 V5 0.04 (100%) motion

So, DCM…. enables one to infer hidden neuronal processes from fMRI data allows one to test mechanistic hypotheses about observed effects uses a deterministic differential equation to model neuro-dynamics (represented by matrices A,B and C). is informed by anatomical and physiological principles. uses a Bayesian framework to estimate model parameters is a generic approach to modelling experimentally perturbed dynamic systems. provides an observation model for neuroimaging data, e.g. fMRI, M/EEG DCM is not model or modality specific (Models will change and the method extended to other modalities e.g. ERPs, LFPs)

Some useful references • The first DCM paper: Dynamic Causal Modelling (2003). Friston et al. NeuroImage 19:1273-1302. • Physiological validation of DCM for fMRI: Identifying neural drivers with functional MRI: an electrophysiological validation (2008). David et al. PLoS Biol. 6 2683–2697 • Hemodynamic model:Comparing hemodynamic models with DCM (2007). Stephan et al. NeuroImage 38:387-401 • Nonlinear DCMs:Nonlinear Dynamic Causal Models for FMRI (2008). Stephan et al. NeuroImage 42:649-662 • Two-state model: Dynamic causal modelling for fMRI: A two-state model (2008). Marreiros et al. NeuroImage 39:269-278 • Group Bayesian model comparison: Bayesian model selection for group studies (2009). Stephan et al. NeuroImage 46:1004-10174 • 10 Simple Rules for DCM (2010). Stephan et al. NeuroImage 52.

Thank you for your attention!!!

Friday 22 nd Oct. 2010 SPM fMRI course Wellcome Trust Centre for Neuroimaging London